Distribution of δ-connected components of self-affine sponge of Lalley-Gatzouras type

Abstract

Let (E, ) be a metric space and let hE( δ ) be the cardinality of the set of δ-connected components of E. In literature, in case of that E is a self-conformal set satisfying the open set condition or E is a self-affine Sierpi\'nski sponge, necessary and sufficient condition is given for the validity of the relation hE(δ) δ-B E, when δ 0. In this paper, we generalize the above result to self-affine sponges of Lalley-Gatzouras type; actually in this case, we show that there exists a Bernoulli measure μ such that for any cylinder R, it holds that hR(δ) μ(R) δ-B E, when δ 0.